Perfect codes in generalized Fibonacci cubes

Abstract

The Fibonacci cube of dimension n, denoted as \n, is the subgraph of the n-cube Q\n induced by vertices with no consecutive 1's. In an article of 2016 Ashrafi and his co-authors proved the non-existence of perfect codes in \n for n≥ 4. As an open problem the authors suggest to consider the existence of perfect codes in generalization of Fibonacci cubes. The most direct generalization is the family \n(1s) of subgraphs induced by strings without 1s as a substring where s≥ 2 is a given integer. We prove the existence of a perfect code in \n(1s) for n=2p-1 and s ≥ 3.2p-2 for any integer p≥ 2.